Thank you for step by step explanation of the material. I always refer to your videos before reading my instructor's notes. Please, don't stop posting. You are contributing tremendously to our education!
Thank you Ma'am. You made me really interested in math! I am a 12th grade student and gave my school finals this year! I usually stayed away from discrete math! But you made it so clear! Love your playlist and I am gonna watch all the videos! Love from India
Thank you for these videos. You are a life saver. Every math professor I have does not seem to be able to get to the point or explain things clearly. I don't understand why this is such a common problem with math teachers in particular. I'm so grateful for you, Organic Chemistry Tutor, etc.
I don't quite understand how you simplified a2 to 2 + 2(3) at 12:04. I understand the pattern after, I just can't grasp the idea of simplifying (2 + 3) + 3 to 2 + 2(3).
These videos should be made required supplementary reference videos for every discrete math course following the Rosen textbooks. Cramming for my discrete math midterm rn and this video saved me bc I was too rushed/lazy read the book. Thanks Professor :)
Hey hope you are doing alright just I wanna say that GOD loved the world so much he sent his only begotten son Jesus to die a brutal death for us so that we can have eternal life and we can all accept this amazing gift this by simply trusting in Jesus, confessing that GOD raised him from the dead, turning away from your sins and forming a relationship with GOD.
I’ve watched like 3 videos on this already and you’re the only one that mentioned why we would want to solve a recurrence relation in the first place. Seems obvious now thinking about it. Thanks for your help ❤
I am reading "Discrete Mathematics and its Applications", that topic is not as clear at all, some context/aim is missing, but you made it really clear now. Thanks so much to share your knowledge with us.
To know that you can and show that you can solve. If you are doing the math for yourself, you certainly don’t have to, but as a professor if my students don’t back up their solution with work or rationale, they don’t get any credit!
Hi, I hope that following steps would help you. I don't know how to type a sub n .. so consider An as a sub n. So when we are trying to find A2 because we already know A0 and A1. we use the given formula. A2= A2-1 + 2A2-2 so we replace n with 2 because we are trying to find a sub 2. So next step is what Kimberly did A2= A1 + 2A0. Now plug the values: A1 is 5 and A0 is 2. So, A2= 5 + 2(2) => 9.
